P-points, MAD families and Cardinal Invariants

This is the Ph.D. thesis of the author, which was written under the supervision of Michael Hru\v{s}\'{a}k at UNAM. The main contributions of this thesis are the following: There is a $+$-Ramsey \textsf{MAD} family. This answers an old question of Michael Hru\v{s}\'{a}k. There are no $P$-points in the Silver model, answering a question of Michael Hru\v{s}\'{a}k (this is joint work with David Chodounsk\'{y}. The statement \textquotedblleft There are no $P$-points\textquotedblright\ is consistent with the continuum being arbitrarily large, this answers an open question regarding $P$-points. Every Miller indestructible \textsf{MAD} family is $+$-Ramsey. This improves a result of Hru\v{s}\'{a}k and Garc\'{\i}a Ferreira. A Borel ideal is Shelah-Stepr\={a}ns if and only if it is Kat\v{e}tov above \textsf{FIN}$\times$\textsf{FIN}$.$ This entails that Shelah-Stepr\={a}ns \textsf{MAD} families have very strong indestructibility properties. Cohen indestructible \textsf{MAD} families exist generically if and only if $\mathfrak{b=c}$. The equality \textsf{non}$\left( \mathcal{M}\right) =\omega_{1}$ implies the $\left( \ast\right) $ principle of Sierpi\'{n}ski. This answers a question of Arnie Miller.